Congruences related to the Ramanujan/Watson mock theta functions $$\omega (q)$$ ω ( q ) and $$\nu (q)$$ ν ( q )

Abstract

Recently, Andrews, Dixit, and Yee introduced partition functions associated with the Ramanujan/Watson mock theta functions \(\omega (q)\) and \(\nu (q)\). In this paper, we study arithmetic properties of the partition functions. Based on one of the results of Andrews, Dixit, and Yee, mod 2 congruences are obtained. In addition, infinite families of mod 4 and mod 8 congruences are presented. Lastly, an elementary proof of the first explicit examples of congruences for \(\omega (q)\) given by Waldherr is presented.